The altitude of an airplane is decreasing at a rate of 43 feet per second. What is the change in altitude of the airplane over a period of 33 seconds?

To find the change in altitude of the airplane over a period of 33 seconds, you can use the formula:

\[ \text{Change in altitude} = \text{rate of change} \times \text{time} \]

In this case, the rate of change is \(-43\) feet per second (because the altitude is decreasing), and the time is \(33\) seconds.

Calculating the change in altitude:

\[ \text{Change in altitude} = -43 , \text{feet/second} \times 33 , \text{seconds} = -1,419 , \text{feet} \]

Thus, the change in altitude of the airplane over the 33 seconds is \(-1,419\) feet.

The correct answer is:

B. -1,419 feet